A Measure Zero Universal Differentiability Set in the Heisenberg Group
Abstract
We show that the Heisenberg group Hn contains a measure zero set N such that every Lipschitz function f Hn R is Pansu differentiable at a point of N. The proof adapts the construction of small 'universal differentiability sets' in the Euclidean setting: we find a point of N and a horizontal direction where the directional derivative in horizontal directions is almost locally maximal, then deduce Pansu differentiability at such a point.
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